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The Grothendieck-Pietsch domination principle for nonlinear summing integral operators

Volume 129 / 1998

Karl Lermer Studia Mathematica 129 (1998), 97-112 DOI: 10.4064/sm-129-2-97-112

Abstract

We transform the concept of p-summing operators, 1≤ p < ∞, to the more general setting of nonlinear Banach space operators. For 1-summing operators on B(Σ,X)-spaces having weak integral representations we generalize the Grothendieck-Pietsch domination principle. This is applied for the characterization of 1-summing Hammerstein operators on C(S,X)-spaces. For p-summing Hammerstein operators we derive the existence of control measures and p-summing extensions to B(Σ,X)-spaces.

Authors

  • Karl Lermer

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